Answer:
Value of x is 6.
Step-by-step explanation:
Using logarithmic rules:
- [tex]\log_b mn = \log_b m+ \log_b n[/tex]
- [tex]\log_b x^n = n \log_b[/tex]
- if [tex]\log_b x = \log_b y[/tex] then x = y
Solve: [tex]4 \log_{12} 2+\log_{12} x = \log_{12} 96[/tex]
Apply the logarithmic rules:
[tex]\log_{12} 2^4+\log_{12} x = \log_{12} 96[/tex]
[tex]\log_{12} 16+\log_{12} x = \log_{12} 96[/tex]
then;
[tex]\log_{12} 16x = \log_{12} 96[/tex]
Again apply the same rules:
16x = 96
Divide both sides by 6 we get;
x = 6
therefore, the value of x is 6
